Ten place tables of the Jacobian elliptic functions.
Part III /
Henry E. Fettis, James C. Caslin.

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Main Author
Fettis, Henry E.
Related Names
Caslin, James C., author.
Aerospace Research Laboratories (U.S.)
Applied Mathematics Research Laboratory (U.S.)
Language(s)
English
Published
Wright-Patterson Air Force Base, Ohio : Aerospace Research Laboratories, Office of Aerospace Research, United States Air Force, 1971.
Subjects
Jacobi forms.
Functions, Meromorphic.
Elliptic functions.
Functions, Meromorphic.
Jacobi forms.
Elliptic functions > Tables.
Tables.
Summary
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta))).
Note
Research supported by the Aerospace Research Laboratories, Office of Aerospace Research, United States Air Force and performed by the Applied Mathematics Research Laboratory.
Document is chiefly tables.
AD0729198. (from http://www.dtic.mil).
"May 1971."
Physical Description
iv, 449 pages : tables ; 28 cm.
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